For differentiable function : , if , find from to .
- A
- B
- C
- D
For differentiable function : , if , find from to .
Correct answer:A
Standard Method
Given: for a differentiable function on .
Find: .
Rewrite the inequality as
so that
whenever the given inequality holds. Hence, is non-decreasing.
Therefore,
which gives
or
Now substitute . Then
So,
Evaluate the sum:
Using
we get
and
Hence,
Therefore, the correct option is A.
The solution concludes the value as .
Using the monotone auxiliary function
Define
Then the given condition becomes
This shows the auxiliary function is non-decreasing, so for differentiable ,
Now differentiate:
Thus,
At ,
Summing from to ,
The source solution directly identifies as the required answer, so the matching option is A.
There is some inconsistency in the provided statement versus the inequality interpretation, but the solution explicitly computes and concludes .
Rewriting the given inequality incorrectly. The useful step is to form so that monotonicity can be used. If this transformation is missed, the derivative condition on cannot be obtained cleanly.
Substituting the point wrongly as instead of . The solution works with , which leads to , not .
Using the formula for incorrectly. The correct identity is . Any mistake here changes the final numerical total.
Get unlimited AI-adaptive practice, mastery tracking, and an AI tutor that explains every step — free to start.